Two different cross sections are taken parallel to the base of a three-dimensional figure. The two cross sections are the same shape, but are not congruent. Which could be the three-dimensional figure?.

The geometric figures which could be this three-dimensional figure are:

Cone

Triangular pyramid

Square pyramid

What is a cross section?

A cross section can be defined as an exposed surface or shape that is formed when a cut is made through a three-dimensional figure.

In this scenario, the geometric figures which could be this three-dimensional figure are:

Cone: when cut horizontally, its cross section would always form a circle of different sizes.

Triangular pyramid: when cut horizontally, its cross section would always form a triangle of different sizes.

Square pyramid: when cut horizontally, its cross section would always form a square of different sizes.

geometric figureswhich could be thisthree-dimensional figureare:## What is a cross section?

cross sectioncan be defined as an exposed surface or shape that is formed when acutis made through athree-dimensional figure.geometric figureswhich could be thisthree-dimensional figureare:Cone: whencut horizontally, itscross sectionwould always form acircleof differentsizes.Triangular pyramid: whencut horizontally, itscross sectionwould always form atriangleof differentsizes.Square pyramid: whencut horizontally, itscross sectionwould always form asquareof different sizes.